Method of managing resources in a telecommunication network or a computing system

ABSTRACT

The present invention includes a method for sharing a quantity of resources between several users in a telecommunication network or a computing system starting from a given date. The method includes updating a tree, each node of which represents a time period. The tree contains at least one node representing a time period including the given date. The concatenation of the time periods represented by daughter nodes of a parent node represent the time period represented by the parent node.

CROSS-REFERENCE TO RELATED APPLICATION

This application claims priority to foreign French patent application No. FR 09 06394, filed on Dec. 30, 2009, the disclosure of which is incorporated by reference in its entirety.

FIELD OF THE INVENTION

The present invention relates to a method of managing resources in a telecommunication network or a computing system. The invention improves bandwidth over a communication link, or disk space on servers, and/or computation time on a processor.

The resources of a telecommunication network or of a computing system are often shared between several users. When the resource requirements can be planned, the administrator of the network may manage a resource reservation calendar so as to know the availability of the network. Unfortunately, when the number of reservations is high, the existing calendar management mechanisms require very long computation times.

U.S. Pat. No. 6,374,249 B1 discloses a data structure and operations for time-dependant variables in a model of an enterprise. However, the method described in that patent is not effective for managing a large number of resource reservations.

Patent application EP 1 443 445 A1 discloses an improved method and improved device for managing a resource calendar. However, on the one hand, the method and device described are not capable of efficiently managing permanent reservations, that is to say those with no end date, and, on the other hand, the calendar described is of fixed length and manages only time periods of fixed granularity. Thus, in the case of a reservation made a long time in advance, this may mean, as consequence of accepting this reservation, that the network does not have the necessary resources to support it. Finally, it periodically requires an operation expensive in O(M.log n), in which n is the size of the calendar expressed as the number of smaller periods represented in the calendar and M is the number of reservations made in the calendar.

SUMMARY OF THE INVENTION

The invention optimizes the times required to execute base operations on a resource reservation calendar, e.g., the operations of adding and removing a reservation, the computation of the quantity of resources available and the shift in time of the period covered by the calendar, whatever the number, duration and granularity of the reservations. To do this, the present invention proposes to construct a dynamic reservation tree and to manage variables specific to the permanent reservations, this tree and these variables making it possible to use an algorithm efficient in O(log n) for the base operations. For this purpose, the subject of the invention is a method for sharing a quantity of resource Q_(total) between several users in a telecommunication network or a computing system starting from a given date. The method includes the updating of a tree, each node of which represents a time period. The tree contains at least one node representing a time period that includes the given date. The concatenation of the time periods represented by the daughter nodes of a parent node represents the time period represented by said parent node.

Advantageously, the updating of the tree may comprise, so as to record a period of reservation P of a quantity Q_(r) of resources by a user in the tree, a step of adding nodes to the tree in such a way that the root node of the tree includes the start date of the period P.

The step of adding nodes to the tree may furthermore include adding all the minimum nodes of the reservation period P. If the reservation P is a non-permanent period with an end date, a node is a minimum node of the reservation P if it represents a time period included within the period P and if its parent node represents a time period not entirely included within the period P. If the reservation period P is a permanent period with no end date, a node is a minimum node of the reservation period P if it represents a time period included within the period going from the start date of the period P up to the end of the time period represented by the root node of the tree.

In an embodiment, each node of the tree may contain a field Q_(n) equal to the sum of the quantities of resources reserved for the reservations having said node from among its minimum nodes, and also a field Q_(f) equal to zero if said node has no daughter nodes or is equal to the maximum of Q_(n)+Q_(f) for all the daughter nodes of said node if said node has at least one daughter node.

In an embodiment, the method may include a step of computing the quantity Q_(d) of resources available over the reservation period P. If the start date of the period P is after the end of the time period represented by the root node of the tree, then the quantity Q_(d) is equal to Q_(total)−Q_(p0)−Q_(p1), in which Q_(p0) is a variable equal to the sum of quantities of resources reserved for the permanent reservations having the root node of the tree as minimum node and Q_(p1) is a variable equal to the sum of the quantities of resources reserved for permanent reservations not having the root node of the tree as minimum node. Otherwise, the quantity Q_(d) is equal to

$Q_{total} - {{\underset{i \in {\{{{minimum}\mspace{14mu} {nodes}\mspace{14mu} {of}\mspace{14mu} P}\}}}{Max}\left( {{Q_{n}(i)} + {Q_{f}(i)} + {\sum\limits_{j \in {\{{{parents}\mspace{14mu} {of}\mspace{14mu} i}\}}}{Q_{n}(j)}}} \right)}.}$

The quantity Q_(r) being less than the quantity Q_(d), the step of adding nodes to the tree may furthermore include, if a daughter node of an existing node is added, setting the fields Q_(n) and Q_(f) of said added node to the value zero. Otherwise, if a node is added and if it is the new root node, then, if the old root node is the leftmost daughter node of the new root node, then the step of adding nodes to the tree may include assigning the value of Q_(p0) to the field Q_(n) of the new root and decrementing the field Q_(n) of the old root by Q_(p0). Otherwise, the step of adding nodes to the tree may include assigning the value zero to the field Q_(n) of the new root, incrementing the variable Q_(p1) by Q_(p0) and assigning the value zero to the variable Q_(p0). The step of adding nodes to the tree may then include assigning the sum of the fields Q_(n) and Q_(f) of the old root to the field Q_(f) of the new root, and adding the right-hand brother nodes of the old root, the value of Q_(p1) being assigned to the fields Q_(n) of said right-hand brother nodes and the value zero being assigned to the fields Q_(f) of said right-hand brother nodes. If the period P is a permanent period with no end date, the step of adding nodes to the tree may include incrementing Q_(p0) by Q_(r) if the root of the tree is a minimum node and otherwise incrementing Q_(p1) by Q_(r). The step of adding nodes to the tree may include adding the quantity Q_(r) to the fields Q_(n) of all the minimum nodes of the period P and updating the fields Q_(f) of all the parent nodes of said minimum nodes.

Advantageously, here again, the updating of the tree may include, so as to modify or remove the recording in the tree of the reservation period P of the quantity Q_(r) of resources, a step of modifying nodes in the tree or removing nodes therefrom. This step may include decrementing the fields Q_(n) of all the minimum nodes of the period P by Q_(r), updating the fields Q_(f) of all the parent nodes of said minimum nodes and removing the leaf nodes of the tree having a field Q_(n) equal to zero. If the period P is a permanent period with no end date, this step may include decrementing Q_(p0) by Q_(r) if the root of the tree is a minimum node, and otherwise decrementing Q_(p1) by Q_(r).

Advantageously, here again, the updating of the tree may comprise, so as to purge the tree, a step of removing the nodes from the tree that represent elapsed time periods.

For example, each node may represent a time period of duration equal to a number of years or a fraction of a year, or a number of months or a fraction of a month, or a number of days or a fraction of a day, or a number of hours or a fraction of an hour, or a number of minutes or a fraction of a minute, or a number of seconds or a fraction of a second.

For example, the given date may be the current date, so as to be able to share the quantity of resources Q_(total) immediately.

For example, the quantity of resources Q_(total) may be a quantity of a bandwidth expressed in bits per second, or a quantity of disk space expressed in bytes, or else a quantity of computation time for a processor expressed as a percent.

Again, the invention has the main advantages that, by making it possible for constraints on the minimum granularity and the coverage of the calendar, but not on the number of reservations, to be specifically set, it enables the time to execute the operations on the calendar to be limited. Thus, by offering computation times independent to the number of reservations, the invention is particularly suitable for real-time systems.

BRIEF DESCRIPTION OF THE DRAWINGS

Other features and advantages of the invention will become more readily apparent from the following detailed description, taken in conjunction with the appended drawings, in which:

FIG. 1 is, an example of a calendar grid according to the invention; and

FIG. 2 is an example of a calendar according to the invention.

DETAILED DESCRIPTION

The term “date” is used broadly herein. For example, a date may be expressed in the form year/month/day/hour/minute/second, but additional embodiments are not limited thereto.

In an embodiment, a resource, which can be represented by an integer, must be shared between several users. To plan the use of this resource, the users must make reservation requests. Each reservation is defined by several characteristics. A reservation first of all indicates a start date, which is equal to or greater than a predefined date D_(min). The value of D_(min) may increase over the course of time, since D_(min) may, for example, correspond to the current date. A reservation may possibly indicate an end date. If no value is provided for this end date, the reservation is said to be a permanent reservation. A reservation also indicates the quantity of resources to be reserved. For example, this may involve the bandwidth in bits per second over a communication link, or disk space in bytes on a server, or else computation time as a percent on a processor.

FIG. 1 illustrates an example of a calendar grid according to the invention. A calendar according to the invention is a tree structure of reservations following the grid illustrated in FIG. 1. The grid illustrated in FIG. 1 may also be seen as an empty calendar according to the invention, in which no reservation has yet been made.

Each node of the grid is illustrated by a dotted circle and represents a period of time. Each node is the parent of a set of daughter nodes, which each represent a portion of the time period of the parent node. The concatenation of all the periods represented by the daughter nodes is equal to the period represented by the parent node. For example, each day is represented by a node, which has itself two daughter nodes each representing a half-day, which themselves each have two daughter nodes each representing a period of 6 hours, which themselves each have three daughter nodes each representing a period of 2 hours, which themselves each have two daughter nodes each representing a period of 1 hour. For the sake of clarity, the nodes representing periods of ½ hour have not been shown in FIG. 1. Thus, a day may be represented by a number of nodes varying from one to infinity.

Any calendar according to the invention is the instance of a part of the grid illustrated by FIG. 1. A calendar according to the invention is a tree, the nodes of which are instanced so that:

-   -   a node is instanced only when it is necessary to record a         reservation in the calendar, as explained below. However, the         tree must have a minimum of one node, which represents a period         of time including the previously defined date D_(min), and     -   there is no limit in the depth of the tree if no constraint is         fixed on possible reservations.

It should be noted that, to improve the efficiency of the invention, it is preferable for the grid to be divided into the times usually used for reservations. For example, it is preferable for the nodes to represent days, ½ days and periods of 6, 2 and 1 hour, rather than 1024th of a year.

A set of minimum nodes in the calendar grid corresponds to a finite reservation period P, i.e. one with an end date. A node is minimum for the finite period P if and only if this node meets the following two conditions:

-   -   the period represented by the node is included within the period         P; and     -   the period represented by the parent node is not entirely         included within the period P.

A set of minimum nodes in the calendar grid also corresponds to an infinite reservation period P, i.e. one with a start date but no end date. The set of minimum nodes of the infinite period P is equal to the minimum nodes of the period going from the start of the period P up to the end of the period represented by the root of the tree. If the start date of the infinite period P is after the period represented by the root of the tree, then the tree is extended so that the new root of the tree includes the start date of the period P.

It should be noted that, as illustrated for example in FIG. 2 below, when a reservation is added to the tree, each minimum node of the reservation period is instanced in the tree.

FIG. 2 illustrates an example of a calendar according to the invention containing a first reservation going from 2 h to 9 h and a second, permanent reservation starting at 5 h. The tree corresponding to this calendar is indicated by the bold solid lines. The root of this tree is indicated in FIG. 2. The minimum nodes of the first reservation are indicated in black. The minimum nodes of the second reservation are indicated by a cross.

The number of minimum nodes for a reservation is at most equal to 2 log₂(n)+2(o−2), where n is the size of the calendar expressed as number of shortest periods represented in the tree, i.e. the period of the leaves of the tree at the lowest level, and o is the order of the tree. The path of these minimum nodes may be effected as O(log(n)). Two values are stored in each node of the tree, namely:

-   -   Q_(n): the sum of the quantities of resources reserved for the         reservations having this node as minimum node; and     -   Q_(f): the maximum value of (Q_(n)+Q_(f)) between all the         daughter nodes, or zero if the node has no daughters.

In addition to the tree described above, two integer variables are defined:

-   -   Q_(p0) is the sum of the quantities of resources reserved for         permanent reservations having the top of the tree as minimum         node; and     -   Q_(p1) is the sum of the quantities of resources reserved for         permanent reservations not having the top of the tree as minimum         node.

These variables are used when a new reservation requires the tree to be extended in order to cover a longer time period, as explained below.

Advantageously, the present example of a calendar according to the invention may be managed using four base operations: computation of the quantity of resources available over a given period; addition of a reservation; removal of a reservation; and purging of the past. Purging of the past is a very optional operation amounting to removing the leftmost branch of the tree, corresponding to the period that has just elapsed. As defined below, each of these operations may be carried out with a time complexity expressed as O(log n), where “n” is the size of the calendar expressed as the number of shortest periods represented in the tree, i.e. the period of the leaves of the tree at the lowest level.

Advantageously, the operation of computing the quantity of resources available over a given period P may be carried out in the following manner. First of all, the start of the period P must be greater than or equal to D_(min). The total quantity of resources to be distributed is denoted by Q_(total).

If the start of the period P is greater than or equal to the end of the period covered by the tree, then the quantity available over the period P is equal to Q_(total)−Q_(p0)−Q_(p1). Otherwise, the quantity available over the period is equal to:

$Q_{total} - {\underset{i \in {\{{{minimum}\mspace{14mu} {nodes}\mspace{14mu} {of}\mspace{14mu} P}\}}}{Max}\left( {{Q_{n}(i)} + {Q_{f}(i)} + {\sum\limits_{j \in {\{{{parents}\mspace{14mu} {of}\mspace{14mu} i}\}}}{Q_{n}(j)}}} \right)}$

where Q_(n) and Q_(f) are zero for the nodes of the grid that have not been instanced in the tree. It should be noted that the path of the set of minimum nodes may be made with a time complexity expressed as O(log n). Since this path is followed from the root of the tree, the sum of the quantities Q_(n)(j) is thus easily computed.

Advantageously, the operation of adding a reservation may be carried out by adding the quantity of resources reserved to the quantities Q_(n) of all the minimum nodes of the reservation period and by recomputing Q_(f) for all the parents of the minimum nodes. This operation may require adding nodes to the tree. For each node created:

if the node created is the daughter of an existing node, then the Q_(n) and Q_(f) values are set to zero;

otherwise, the node created is the new root of the tree and the following operations are carried out in the order below:

-   -   if the old root is the leftmost daughter of the new root, then:         -   Q_(n)(new root)=Q_(p0);         -   Q_(n)(old root)=Q_(n)(old root)−Q_(p0),     -   otherwise:         -   Q_(n)(new root)=0;         -   Q_(p1)=Q_(p1)+Q_(p0);         -   Q_(p0)=0.     -   Q_(f)(new root)=Q_(n)(old root)+Q_(f)(old root).     -   The right-hand brothers of the old root are created with:         -   Q_(n)=Q_(p1);         -   Q_(f)=0.

If the new reservation is permanent, then the quantity of resources reserved is added to Q_(p0) if the root of the tree is a minimum node, otherwise it is added to Q_(p1).

Advantageously, the operation of removing a reservation may be carried out by subtracting the quantity of resources reserved from the quantities Q_(n) of all the minimum nodes of the reservation period with D_(min) as minimum date and by recomputing the Q_(f) for all the parents of the minimum node.

Along the path of the minimum nodes, the leaves of the tree having a zero Q_(n) may be destroyed.

If the reservation removed was a permanent reservation, then the quantity of resources reserved is subtracted from Q_(p0) if the root of the tree is a minimum node, otherwise it is subtracted from Q_(p0).

Advantageously, the operation of purging the past may enable the memory to be freed up by removing the nodes that correspond to a past period. It is planned at the end date of the leftmost leaf of the tree. D_(min) then takes this end date as new value. As indicated above, the new value of D_(min) must be included within the period covered by the root. If necessary, a new root may be created, as during the addition of a reservation. All the nodes of the left-hand branch of the tree having an end date equal to or earlier than D_(min) are then removed. It should be noted that recomputing the Q_(f) of the parent nodes is not necessary since, owing to the new value of D_(min), these nodes may no longer form part of the minimum nodes of a reservation.

The invention described above is particularly efficient when the number of reservations is large. 

1. A method for sharing a quantity of resources Q_(total) between several users in one of a telecommunication network and a computing system, starting from a given date, said method comprising the updating of a tree, wherein each node of the tree represents a time period, the tree containing at least one node representing a time period that includes the given date and the concatenation of the time periods represented by daughter nodes of a parent node representing the time period represented by said parent node, the updating of the tree includes, to record a period of reservation P of a quantity Q_(r) of resources by a user in the tree, a step of adding nodes to the tree in such a way that the root node of the tree includes the start date of the period P, and said method further comprises a step of adding nodes to the tree including adding all the minimum nodes of the reservation period P, a node being a minimum node of the reservation period P if: when the reservation period P is a non-permanent period with an end date, said node represents a time period included within the period P and the parent node of said node represents a time period not entirely included within the period P; and when the reservation period P is a permanent period with no end date, said node represents a time period included within the period going from the start date of the period P up to the end of the time period represented by the root node of the tree.
 2. The method according to claim 1, wherein each node of the tree includes: a field Q_(n) equal to the sum of the quantities of resources reserved for the reservations having said node from among its minimum nodes; a field Q_(f) equal: to zero if said node has no daughter node; and to the maximum of Q_(n)+Q_(f) for all the daughters nodes of said node if said node has at least one daughter node.
 3. The method according to claim 2, further comprising a step of computing the quantity Q_(d) of resources available over the reservation period P, the quantity Q_(d) being equal: to Q_(total)−Q_(p0)−Q_(p1) if the start date of the period P is after the end of the time period represented by the root node of the tree, in which: Q_(p0) is a variable equal to the sum of the quantities of resources reserved for the permanent reservations having the root node of the tree as minimum node; Q_(p1) is a variable equal to the sum of the quantities of resources reserved for the permanent reservations not having the root node of the tree as minimum node; and otherwise to $Q_{total} - {{\underset{i \in {\{{{minimum}\mspace{14mu} {nodes}\mspace{14mu} {of}\mspace{14mu} P}\}}}{Max}\left( {{Q_{n}(i)} + {Q_{f}(i)} + {\sum\limits_{j \in {\{{{parents}\mspace{14mu} {of}\mspace{14mu} i}\}}}{Q_{n}(j)}}} \right)}.}$
 4. The method according to claim 3, wherein, the quantity Q_(r) being less than the quantity Q_(d), the step of adding nodes to the tree further comprises: if a daughter node of an existing node is added, setting the fields Q_(n) and Q_(f) of said added node to the value zero; otherwise, if a node is added and if it is the new root node, then: if the old root node is the leftmost daughter of the new root node, then: assigning the value of Q_(p0) to the field Q_(n) of the new root; decrementing the field Q_(n) of the old root by Q_(p0); and otherwise: assigning the value zero to the field Q_(n) of the new root; incrementing the variable Q_(p1) by Q_(p0); assigning the value zero to the variable Q_(p0); assigning the sum of the fields Q_(n) and Q_(f) of the old root to the field Q_(f) of the new root; adding the right-hand brother nodes of the old root, the value of Q_(p1) being assigned to the fields Q_(n) of said right-hand brother nodes and the value zero being assigned to the fields Q_(f) of said right-hand brother nodes; if the period P is a permanent period with no end date: if the route of the tree is a minimum node, incrementing Q_(p0) by Q_(r); and otherwise, incrementing Q_(p1) by Q_(r); adding the quantity Q_(r) to the fields Q_(n) of all the minimum nodes of the period P; and updating the fields Q_(f) of all the parent nodes of said minimum nodes.
 5. The method according to claim 3, wherein the updating of the tree comprises, to modify or remove the recording in the tree of the reservation period P of the quantity Q_(r) of resources, a step of modifying nodes in the tree or removing nodes therefrom, said step comprising: decrementing the fields Q_(n) of all the minimum nodes of the period P by Q_(r); updating the field Q_(f) of all the parent nodes of said minimum nodes; removing the leaf nodes of the tree having a field Q_(n) equal to zero; if the period P is a permanent period with no end date: if the root of the tree is a minimum node, decrementing Q_(p0) by Q_(r); and otherwise, decrementing Q_(p1) by Q_(r).
 6. The method according to claim 1, wherein the updating of the tree comprises, to purge the tree, a step of removing nodes from the tree, representing elapsed time periods.
 7. The method according to claim 1, wherein each node represents a time period of duration equal to one of: a number of years or a fraction of a year; a number of months or a fraction of a month; a number of days or a fraction of a day; a number of hours or a fraction of an hour; a number of minutes or a fraction of a minute; and a number of seconds or a fraction of a second.
 8. The method according to claim 1, wherein the given date is the current date, to share the quantity of resources Q_(total) immediately.
 9. The method according to claim 1, wherein the quantity of resources Q_(total) is one of: a quantity of bandwidth expressed in bits per second; or a quantity of disk space expressed in bytes; and a quantity of computation time of a processor expressed as a percent. 